N-th Order Linear Differential Equations 173THEOREM 4.1 Let the functions y 1 (x),y 2 (x), ... ,ym(x) all be differen-
tiable at least m - 1 times for all x in some interval I. If the functions
Y1, Y2, ... , Ym are linearly dependent on the interval I , then the WronskianW(y1, Y2, ... , Ym, x) = 0 for all x E J.
Proof: Since by hypothesis the set of functions {yl ( x), Y2 ( x), ... , Ym ( x)}
is assumed to be linearly dependent on the interval I , there exist constantsc1, c2, ... , Cm not all zero such that
C1Y1(x) + C2Y2(x) + · · · + CmYm(x) = 0 for all x EI.
Differentiating this equation m - 1 times, we find for all x E IThis system of m equations in the m unknowns c 1 , c 2 , ... , Cm may be written
in matrix-vector notation as(14)
(~~ ~~(~-1) (m-1)
Y1 Y2 · · ·Ym Yr;'. ) ( C1 C2. ) (0) (^0).
......
Ym (m-1) C m^0
(If you are unfamiliar with matrix-vector notation, see section 8.1.) Recall
from linear algebra the theorem which states: "A homogeneous system of
m equation in m unknowns has a nonzero solution if and only if the deter-
minant of the coefficient matrix is zero." Since we have assumed that not
all of the unknowns (the Cis) are zero, equation (14) has a nonzero solution
and, therefore, the determinant of the coefficient matrix is zero- that is,
W(y1,y2, .. ·Ym,x) = 0 for all x EI.The functions y 1 = sin 2x and y2 = sin x cos x are linearly dependent on theinterval (-00,00), since 1 · y 1 - 2 · Y2 = 1 · sin2x - 2 · sinxcosx = 0 for all
x E (-oo, oo). Hence, by Theorem 4 .1, we must have W(y1, y2, x) = 0 for all
x E ( -oo, oo). Calculating this Wronskian, we find for all x E ( -oo, oo)
sin2x sinx cosx2 cos 2x - sin^2 x + cos^2 x